7.6 Concluding a Test for a Population Mean

    Cards (32)

    • The null hypothesis states that the population mean is equal to a specified value, denoted as μ₀
    • Match the statistical variable with its symbol:
      Sample Mean ↔️ xˉ\bar{x}
      Population Mean ↔️ μ\mu
      Sample Standard Deviation ↔️ ss
      Sample Size ↔️ nn
    • The degrees of freedom for a t-test are typically calculated as n-1
    • The null hypothesis for a population mean assumes that the population mean is equal to a specific value
    • If the population is not normal, a large sample size (n ≥ 30) allows the use of the Central Limit Theorem
    • The formula for calculating the t-statistic is t=t =xˉμsn \frac{\bar{x} - \mu}{\frac{s}{\sqrt{n}}}
    • The t-statistic standardizes the difference between the sample mean and population mean to determine if the null hypothesis should be rejected.
      True
    • The p-value represents the probability of obtaining a test statistic at least as extreme as the one observed, assuming the null hypothesis is true.

      True
    • What decision do you make if the p-value is less than the significance level?
      Reject the null hypothesis
    • Rejecting the null hypothesis means the population mean is equal to the specified value.
      False
    • What is the symbolic representation of the alternative hypothesis for a population mean?
      H₁: μ ≠ μ₀
    • Observations within the sample must be independent if the sample size is no more than 10% of the population size
      True
    • Steps to determine the p-value after calculating the t-statistic
      1️⃣ Identify the degrees of freedom (df)
      2️⃣ Use a t-distribution table or software
      3️⃣ Find the p-value associated with t and df
      4️⃣ The p-value represents the probability of obtaining a test statistic at least as extreme as observed
    • The significance level is typically 0.05 or 0.01 in hypothesis testing.

      True
    • Match the hypothesis statement with its symbol:
      Null Hypothesis ↔️ H0:μ=H₀: \mu =μ0 \mu₀
      Alternative Hypothesis ↔️ H1:μμ0H₁: \mu ≠ \mu₀
    • Meeting the conditions for inference ensures the reliability and accuracy of the test results.

      True
    • The population mean in the t-statistic formula is the mean under the null hypothesis
    • To find the p-value, one can use a t-distribution table or a calculator/software with the calculated t-statistic and the degrees of freedom
    • The validity of the p-value depends on meeting the conditions for inference, such as random, normal, and independent data.
      True
    • What decision do you make if the p-value is 0.03 and the significance level is 0.05?
      Reject the null hypothesis
    • What is the symbolic representation of the null hypothesis for a population mean?
      H₀: μ = μ₀
    • If the population is not normal, the sample size must be at least 30
    • The t-statistic formula for testing a population mean is standardizes the difference between the sample mean and population mean.
    • What is the p-value in hypothesis testing?
      Probability of extreme results
    • What does the alternative hypothesis assert in a hypothesis test for a population mean?
      Population mean is not equal
    • What does the independence condition require in hypothesis testing?
      Sample size ≤ 10% of population
    • What does the variable \(\bar{x}\) represent in the t-statistic formula?
      Sample mean
    • What is the formula to calculate degrees of freedom (df) in a t-test?
      df = n - 1
    • What are the typical significance levels used in hypothesis testing?
      0.05 or 0.01
    • If the calculated p-value is greater than or equal to the significance level, you fail to reject the null hypothesis
    • The null hypothesis (H₀) assumes the population mean is equal to a specified value
    • Match the hypothesis with its symbolic representation:
      Null Hypothesis ↔️ H₀: μ = μ₀
      Alternative Hypothesis ↔️ H₁: μ ≠ μ₀
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